Manifold (disambiguation): Difference between revisions

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*[[manifold (automotive)]], a fitting on an internal combustion engine
*[[manifold (automotive)]], a fitting on an internal combustion engine
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A '''manifold''' is an abstract mathematical space that looks locally like [[Euclidean]] space, but globally may have a very different structure. An example of this is a [[sphere]]: if one is very close to the surface of the sphere, it looks like a flat [[plane]], but globally the sphere and plane are very different. Other examples of manifolds include [[lines]] and [[circles]], and more abstract spaces such as the [[orthogonal group]] <math>O(n)</math>
The concept of a manifold is very important within [[mathematics]] and [[physics]], and is fundamental to certain fields such as [[differential geometry]], [[Riemannian geometry]] and [[General Relativity]].
The most basic manifold is a topological manifold, but additional structures can be defined on the manifold to create objects such as differentiable manifolds and Riemannian manifolds.
== Mathematical Definition ==
===Topological Manifold===
In [[topology]], a manifold of dimension <math>n</math>, or an '''n-manifold''', is defined as a [[Hausdorff]] space where an [[open]] [[neighbourhood]] of each point is [[homeomorphic]] (i.e. there exists a smooth bijective map from the manifold with a smooth inverse) to <math>\scriptstyle \mathbb{R}^n </math>.
===Differentiable Manifold===
To define differentiable manifolds, the concept of an '''atlas''', '''chart''' and a '''coordinate change''' need to be introduced. An atlas of the Earth uses these concepts: the atlas is a collection of different overlapping patches of small parts of a spherical object onto a plane. The way in which these different patches overlap is defined by the coordinate change.

Revision as of 15:56, 12 July 2007

The word manifold refers to:

This disambiguation page lists articles associated with the same or a similar title.

A manifold is an abstract mathematical space that looks locally like Euclidean space, but globally may have a very different structure. An example of this is a sphere: if one is very close to the surface of the sphere, it looks like a flat plane, but globally the sphere and plane are very different. Other examples of manifolds include lines and circles, and more abstract spaces such as the orthogonal group

The concept of a manifold is very important within mathematics and physics, and is fundamental to certain fields such as differential geometry, Riemannian geometry and General Relativity.

The most basic manifold is a topological manifold, but additional structures can be defined on the manifold to create objects such as differentiable manifolds and Riemannian manifolds.

Mathematical Definition

Topological Manifold

In topology, a manifold of dimension , or an n-manifold, is defined as a Hausdorff space where an open neighbourhood of each point is homeomorphic (i.e. there exists a smooth bijective map from the manifold with a smooth inverse) to .

Differentiable Manifold

To define differentiable manifolds, the concept of an atlas, chart and a coordinate change need to be introduced. An atlas of the Earth uses these concepts: the atlas is a collection of different overlapping patches of small parts of a spherical object onto a plane. The way in which these different patches overlap is defined by the coordinate change.